K inverse pairs array¶
Time: O(NxK); Space: O(K); hard
Given two integers n and k, find how many different arrays consist of numbers from 1 to n such that there are exactly k inverse pairs.
We define an inverse pair as following: For ith and jth element in the array, if i < j and a[i] > a[j] then it’s an inverse pair; Otherwise, it’s not.
Since the answer may be very large, the answer should be modulo 109 + 7.
Example 1:
Input: n = 3, k = 0
Output: 1
Explanation:
Only the array [1,2,3] which consists of numbers from 1 to 3 has exactly 0 inverse pair.
Example 2:
Input: n = 3, k = 1
Output: 2
Explanation:
The array [1,3,2] and [2,1,3] have exactly 1 inverse pair.
Constraints:
The integer n is in the range [1, 1000] and k is in the range [0, 1000].
[1]:
class Solution1(object):
"""
Time: O(N*K)
Space: O(K)
"""
def kInversePairs(self, n, k):
"""
:type n: int
:type k: int
:rtype: int
"""
M = 1000000007
dp = [[0]*(k+1) for _ in range(2)]
dp[0][0] = 1
for i in range(1, n+1):
dp[i%2] = [0]*(k+1)
dp[i%2][0] = 1
for j in range(1, k+1):
dp[i%2][j] = (dp[i%2][j-1] + dp[(i-1)%2][j]) % M
if j-i >= 0:
dp[i%2][j] = (dp[i%2][j] - dp[(i-1)%2][j-i]) % M
return dp[n%2][k]
[2]:
s = Solution1()
n = 3
k = 0
assert s.kInversePairs(n, k) == 1
n = 3
k = 1
assert s.kInversePairs(n, k) == 2